English

Automorphism-invariant non-singular rings and modules

Rings and Algebras 2017-04-20 v2

Abstract

Theorem 1.2.\textbf{Theorem 1.2.} For a ring AA, the following conditions are equivalent. 1)\textbf{1)} AA is a right automorphism-invariant right non-singular ring. 2)\textbf{2)} AA is a right automorphism-invariant regular ring. 3)\textbf{3)} A=S×TA=S\times T, where SS is a right injective regular ring and TT is a strongly regular ring which contains all invertible elements of its maximal right ring of quotients. Theorem 1.5.\textbf{Theorem 1.5.} For a ring AA with right Goldie radical G(AA)G(A_A), the following conditions are equivalent. 1)\textbf{1)} A/G(AA)A/G(A_A) is a semiprime right Goldie ring. 2)\textbf{2)} Any direct sum of automorphism-invariant non-singular right AA-modules is an automorphism-invariant module. 3)\textbf{3)} Any direct sum of automorphism-invariant non-singular right AA-modules is an injective module.

Keywords

Cite

@article{arxiv.1701.07116,
  title  = {Automorphism-invariant non-singular rings and modules},
  author = {Askar Tuganbaev},
  journal= {arXiv preprint arXiv:1701.07116},
  year   = {2017}
}

Comments

9 pages. The study is supported by Russian Scientific Foundation (project 16-11-10013). arXiv admin note: text overlap with arXiv:1701.07117

R2 v1 2026-06-22T17:59:23.307Z